1. The Space of Real Places of ℝ (x,y) Ron Brown Jon Merzel

2. The Space M( ℝ (x,y))  Weakest topology making evaluation maps continuous  Subbasic “Harrison” sets of the form {  :  (f) ∊(0, ∞)} where f ∊ ℝ (x,y)  Well-known:  Compact  Hausdorff  Connected  Contains torus??? Disk???

3. Our results:  The space is actually path connected.  For each (isomorphism class of) value group, the set of all corresponding places is dense.  Some large collections of mutually homeomorphic subspaces are identified.

4. Method

6. How to represent M

7. How to build a legitimate sequence

8. Example

9. Infinite length sequences

10. How to picture M

13. The infinite bedspring

14. The points of M  Finite sequences corresponding to points of M can be pictured (uniquely) as points on the infinite bedspring.  Infinite sequences corresponding to points of M can be visualized (uniquely) as infinite “paths” through the infinite bedspring.  The topology on the bedspring (induced by the Harrision topology via the bijection) is a little technical.

15. Path connectedness  If you keep only the top or bottom half of each circle, the “half-bubble line” becomes a linearly ordered set, and the induced topology is the order topology.  With that topology, the half-bubble line is homeomorphic to a closed interval on the real line.  Stitching together pieces corresponding to closed intervals gives us paths.

19. Density

20. Self-similarity These all look the same! (Checking the topology is a messy case-by-case computation)

21.  Under the bijection between the set of legitmate signatures and M, this set of signatures corresponds to a certain subbasic open set, determined by a choice of an irreducible polynomial and a sufficiently large rational number.

22. The bijection can be established via “strict systems”  Closely related to the “saturated distinguished chains” of Popescu, Khanduja et al